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61.
2005 HSC Question 8b)
(3)
The shaded region in the diagram is bounded by the circle of radius 2
centred at the origin, the parabola y  x 2  3 x  2 , and the x axis.
By considering the difference of two areas, find the area of the shaded
region.

62.
2005 HSC Question 8b)
(3)
The shaded region in the diagram is bounded by the circle of radius 2
centred at the origin, the parabola y  x 2  3 x  2 , and the x axis.
By considering the difference of two areas, find the area of the shaded
region.
Note: area must be broken up into two areas, due to the different
boundaries.

63.
2005 HSC Question 8b)
(3)
The shaded region in the diagram is bounded by the circle of radius 2
centred at the origin, the parabola y  x 2  3 x  2 , and the x axis.
By considering the difference of two areas, find the area of the shaded
region.
Note: area must be broken up into two areas, due to the different
boundaries.

64.
2005 HSC Question 8b)
(3)
The shaded region in the diagram is bounded by the circle of radius 2
centred at the origin, the parabola y  x 2  3 x  2 , and the x axis.
By considering the difference of two areas, find the area of the shaded
region.
Note: area must be broken up into two areas, due to the different
boundaries.
Area between circle and parabola

65.
2005 HSC Question 8b)
(3)
The shaded region in the diagram is bounded by the circle of radius 2
centred at the origin, the parabola y  x 2  3 x  2 , and the x axis.
By considering the difference of two areas, find the area of the shaded
region.
Note: area must be broken up into two areas, due to the different
boundaries.
Area between circle and parabola and area between circle and x axis

66.
It is easier to subtract the area under the parabola from the quadrant.